Systems of Integro-PDEs with Interconnected Obstacles and Multi-Modes Switching Problem Driven by L\'evy Process

Abstract

In this paper we show existence and uniqueness of the solution in viscosity sense for a system of nonlinear m variational integral-partial differential equations with interconnected obstacles whose coefficients (fi)i=1,·s, m depend on (uj)j=1,·s,m. From the probabilistic point of view, this system is related to optimal stochastic switching problem when the noise is driven by a L\'evy process. The switching costs depend on (t,x). As a by-product of the main result we obtain that the value function of the switching problem is continuous and unique solution of its associated Hamilton-Jacobi-Bellman system of equations. The main tool we used is the notion of systems of reflected BSDEs with oblique reflection driven by a L\'evy process.